We consider a two-sided market under incomplete preference lists with ties, where the goal is to find a maximum size stable matching. The problem is APX-hard, and a 3/2-approximation was given by McDermid [1]. This algorithm has a non-linear running time, and, more importantly needs global knowledge of all preference lists. We present a very natural, economically reasonable, local, linear time algorithm with the same ratio, using some ideas of Paluch [2]. In this algorithm every person make decisions using only their own list, and some information asked from members of these lists (as in the case of the famous algorithm of Gale and Shapley). Some consequences to the Hospitals/Residents problem are also discussed
We consider variants of the classical stable marriage problem in which preference lists may contain ...
In the Stable Marriage problem, when the preference lists are complete, all agents of the smaller si...
AbstractWe consider variants of the classical stable marriage problem in which preference lists may ...
Abstract. We consider the variant of the classical Stable Marriage prob-lem where preference lists c...
We consider the problem of finding a stable matching of maximum size when both ties and unacceptable...
The stable marriage (SM) problem has a wide variety of practical applications, ranging from matching...
In an instance of the stable marriage problem with ties and incomplete preference lists, stable matc...
The stable marriage problem has a wide variety of practical applications, ranging from matching res...
’Algorithm Theory - SWAT 2004’ 9th Scandinavian Workshop on Algorithm Theory, Humlebæk, Denmark, Jul...
Given an instance I of the classical Stable Marriage problem with Incomplete preference lists (smi),...
Given an instance I of the classical Stable Marriage problem with Incomplete preference lists (smi),...
The stable marriage problem has a wide variety of practical applications, ranging from matching resi...
When ties and incomplete preference lists are permitted in the Stable Marriage and Hospitals/Residen...
We present new integer linear programming (ILP) models for NP-hard optimisation problems in instance...
We consider variants of the classical stable marriage problem in which preference lists may contain ...
We consider variants of the classical stable marriage problem in which preference lists may contain ...
In the Stable Marriage problem, when the preference lists are complete, all agents of the smaller si...
AbstractWe consider variants of the classical stable marriage problem in which preference lists may ...
Abstract. We consider the variant of the classical Stable Marriage prob-lem where preference lists c...
We consider the problem of finding a stable matching of maximum size when both ties and unacceptable...
The stable marriage (SM) problem has a wide variety of practical applications, ranging from matching...
In an instance of the stable marriage problem with ties and incomplete preference lists, stable matc...
The stable marriage problem has a wide variety of practical applications, ranging from matching res...
’Algorithm Theory - SWAT 2004’ 9th Scandinavian Workshop on Algorithm Theory, Humlebæk, Denmark, Jul...
Given an instance I of the classical Stable Marriage problem with Incomplete preference lists (smi),...
Given an instance I of the classical Stable Marriage problem with Incomplete preference lists (smi),...
The stable marriage problem has a wide variety of practical applications, ranging from matching resi...
When ties and incomplete preference lists are permitted in the Stable Marriage and Hospitals/Residen...
We present new integer linear programming (ILP) models for NP-hard optimisation problems in instance...
We consider variants of the classical stable marriage problem in which preference lists may contain ...
We consider variants of the classical stable marriage problem in which preference lists may contain ...
In the Stable Marriage problem, when the preference lists are complete, all agents of the smaller si...
AbstractWe consider variants of the classical stable marriage problem in which preference lists may ...